Difference between revisions of "The zero-to-the-power-of-zero problem"
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| + | {{Stub page|grade=A|msg=Oh wow I really didn't add much to this page! It needs work! At least: | ||
| + | * Limit argument | ||
| + | * [[Geometric distribution]] when {{M|p\eq 1}} - calculating the [[Expectation]] in this case involves {{M|0^0\eq 1}} | ||
| + | [[User:Alec|Alec]] ([[User talk:Alec|talk]]) 21:09, 30 November 2017 (UTC)}} | ||
{{Infobox | {{Infobox | ||
|title=The {{M|0^0}} problem | |title=The {{M|0^0}} problem | ||
Latest revision as of 21:09, 30 November 2017
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- Limit argument
- Geometric distribution when p=1 - calculating the Expectation in this case involves 00=1
| The 00 problem | |
| 00 |
Contents
[hide]Problem
- For a detailed list of where the problem matters or occurs on this site see Category for such problemsEditors:[Note 1]
Tentative solutions
Current thinking
Approach 1: xy=eyln(x)
Using the extended real values (R∪{−∞,+∞})[Note 2]
Notes
- Jump up ↑ editors see/use Template:0^0 problem
- Jump up ↑ Where we conventionally think of +∞ as some sort of
